Add to ORKGAbstract. A unified approach is given for the analysis of the weak error of spatially semidiscrete finite element methods for linear stochastic partial dif-ferential equations driven by additive noise. An error representation formula is found in an abstract setting based on the semigroup formulation of stochastic evolution equations. This is then applied to the stochastic heat, linearized Cahn-Hilliard, and wave equations. In all cases it is found that the rate of weak convergence is twice the rate of strong convergence, sometimes up to a logarithmic factor, under the same or, essentially the same, regularity require-ments. 1
We find the weak rate of convergence of approximate solutions of the nonlinear stochastic heat equat...
This paper aims to investigate the finite element weak convergence rate for semilinear parabolic sto...
In this book we analyze the error caused by numerical schemes for the approximation of semilinear st...
We present an abstract framework for analyzing the weak error of fully discrete approximation scheme...
We present an abstract framework for analyzing the weak error of fully discrete approximation scheme...
A unified approach is given for the analysis of the weak error of spatially semidiscrete finite elem...
The stochastic heat equation driven by additive noise is discretized in the spatial variables by a s...
This thesis is concerned with numerical approximation of linear stochastic partialdifferential equat...
Abstract. Semidiscrete finite element approximation of the linear stochas-tic wave equation with add...
Semidiscrete finite element approximation of the linear stochastic wave equation (LSWE) with additiv...
We find the weak rate of convergence of the spatially semidiscrete finite element approximation of t...
We find the weak rate of convergence of the spatially semidiscrete finite element approximation of t...
We present an abstract framework for analyzing the weak error of fully discrete approximation scheme...
The numerical approximation of the mild solution to a semilinear stochastic wave equation driven by ...
The numerical approximation of the mild solution to a semilinear stochastic wave equation driven by ...
We find the weak rate of convergence of approximate solutions of the nonlinear stochastic heat equat...
This paper aims to investigate the finite element weak convergence rate for semilinear parabolic sto...
In this book we analyze the error caused by numerical schemes for the approximation of semilinear st...
We present an abstract framework for analyzing the weak error of fully discrete approximation scheme...
We present an abstract framework for analyzing the weak error of fully discrete approximation scheme...
A unified approach is given for the analysis of the weak error of spatially semidiscrete finite elem...
The stochastic heat equation driven by additive noise is discretized in the spatial variables by a s...
This thesis is concerned with numerical approximation of linear stochastic partialdifferential equat...
Abstract. Semidiscrete finite element approximation of the linear stochas-tic wave equation with add...
Semidiscrete finite element approximation of the linear stochastic wave equation (LSWE) with additiv...
We find the weak rate of convergence of the spatially semidiscrete finite element approximation of t...
We find the weak rate of convergence of the spatially semidiscrete finite element approximation of t...
We present an abstract framework for analyzing the weak error of fully discrete approximation scheme...
The numerical approximation of the mild solution to a semilinear stochastic wave equation driven by ...
The numerical approximation of the mild solution to a semilinear stochastic wave equation driven by ...
We find the weak rate of convergence of approximate solutions of the nonlinear stochastic heat equat...
This paper aims to investigate the finite element weak convergence rate for semilinear parabolic sto...
In this book we analyze the error caused by numerical schemes for the approximation of semilinear st...